Microeconomics BEEM101
Pauline Vorjohann
University of Exeter
Lecture 7: Consumer behavior (part 2)
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Introduction of economic theory, and consumer choice
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Microeconomics BEEM
Pauline Vorjohann
University of Exeter
Lecture 7: Consumer behavior (part 2)
Differentiability
Differentiability of ≽ ensures that the partial derivatives of the representing utility function u are well defined such that we can use them to calculate the MRS:
MRS(x 1 , x 2 ) =
∂u/∂x 1 ∂u/∂x 2
Cobb Douglas
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 x 2.
Cobb Douglas
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 x 2.
≽ is monotone:
Cobb Douglas
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 x 2.
≽ is monotone:x∗^ is on the budget line, i.e. p 1 x 1 ∗ + p 2 x 2 ∗ = w. ≽ is differentiable (indifference curves are smooth):
Cobb Douglas
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 x 2.
≽ is monotone:x∗^ is on the budget line, i.e. p 1 x 1 ∗ + p 2 x 2 ∗ = w. ≽ is differentiable (indifference curves are smooth):MRS(x) = x 2 /x 1.
Cobb Douglas
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 x 2.
≽ is monotone:x∗^ is on the budget line, i.e. p 1 x 1 ∗ + p 2 x 2 ∗ = w. ≽ is differentiable (indifference curves are smooth):MRS(x) = x 2 /x 1. ≽ is also (strictly) convex: (a), (b), or (c) applies. Any bundle with x 1 , x 2 > 0 is strictly preferred to any bundle with x 1 = 0 or x 2 = 0: (a) applies, i.e. MRS(x∗) = x 2 ∗ /x 1 ∗ = p 1 /p 2.
Cobb Douglas
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 x 2.
≽ is monotone:x∗^ is on the budget line, i.e. p 1 x 1 ∗ + p 2 x 2 ∗ = w. ≽ is differentiable (indifference curves are smooth):MRS(x) = x 2 /x 1. ≽ is also (strictly) convex: (a), (b), or (c) applies. Any bundle with x 1 , x 2 > 0 is strictly preferred to any bundle with x 1 = 0 or x 2 = 0: (a) applies, i.e. MRS(x∗) = x 2 ∗ /x 1 ∗ = p 1 /p 2.
⇒ Unique solution to the consumer’s problem:
x∗(p 1 , p 2 , w ) = (w /(2p 1 ), w /(2p 2 ))
Cobb Douglas
Perfect substitutes
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 + x 2.
Perfect substitutes
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 + x 2.
≽ is differentiable:MRS(x) = 1.
Perfect substitutes
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 + x 2.
≽ is differentiable:MRS(x) = 1. ≽ is also (strongly) monotone and convex: (a), (b), or (c) applies.
Perfect substitutes
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 + x 2.
≽ is differentiable:MRS(x) = 1. ≽ is also (strongly) monotone and convex: (a), (b), or (c) applies. For p 1 < p 2 : x 2 ∗ = 0 and MRS(x∗) = 1 > p 1 /p 2 ((c) applies). For p 1 > p 2 : x 1 ∗ = 0 and MRS(x∗) = 1 < p 1 /p 2 ((b) applies).
Perfect substitutes
Suppose ≽ is represented by u(x 1 , x 2 ) = x 1 + x 2.
≽ is differentiable:MRS(x) = 1. ≽ is also (strongly) monotone and convex: (a), (b), or (c) applies. For p 1 < p 2 : x 2 ∗ = 0 and MRS(x∗) = 1 > p 1 /p 2 ((c) applies). For p 1 > p 2 : x 1 ∗ = 0 and MRS(x∗) = 1 < p 1 /p 2 ((b) applies). For p 1 = p 2 : Either x 1 ∗ , x 2 ∗ > 0, or x 1 ∗ = 0, or x 2 ∗ = 0 and MRS(x∗) = 1 = p 1 /p 2 ((a), (b), or (c) applies).